# Could you please check if this substitution is right so far? [closed]

The question:

Use resubstitution to solve the following recurrence equation:

T(N) = 2T(n-1) + n; n >=2 and T(1) = 1

So far I have this:

T(n) = 2T(n-1) + n

= 2(2T(n-2) + (n-1)) + n

= 4T(n-2) + 3n -2

= 2(4T(n-3) + 3(n-1) -2) + n

= 2(4T(n-3) + 3n -3 -2) + n

= 2(4T(n-3) + 3n -5) + n

= 8T(n-3) + 6n - 10 + n

= 8T(n-3) +7n -10

I'm just wondering if so far, the way I'm approaching this is correct. Any help is appreciated, thank you.

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## closed as off topic by Tass, Mitch Wheat, rambo coder, akappa, talonmiesDec 10 '12 at 19:43

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This step is wrong:

``````= 4T(n-2) + 3n -2

= 2(4T(n-3) + 3(n-1) -2) + n
``````

It should be

``````= 4T(n-2) + 3n -2

= 4(2T(n-3) + (n-2)) + 3n - 2
``````

You replace the `T(n-i)` by `2T(n-i-1) + (n-i)`.

Apart from that, I think you're getting this wrong. What your teacher wants you to do, is to feel what the value of `T(n)` will be. In this case, you see that each time you iterate, you multiply the first coefficient by `2`, and you have at the end a member like `an+b`. This means that `T(n) = 2^n + O(n)` because only the biggest member matters.

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